Arturo Magidin
Published 2000-06-08Version 1
We study the strong, weak, and special amalgamation bases in the varieties of nilpotent groups of class two and exponent n, where n is odd. The main result is a characterization of the special amalgamation bases for these varieties. We also characterize the weak and strong bases. For special amalgamation bases, we show that there are groups which are special bases in varieties of finite exponent but not in the variety of all nil-2 groups, whereas for weak and strong bases we show this is not the case. We also show that in these varieties, as well as the variety of all nil-2 groups, a group has an absolute closure (in the sense of Isbell) if and only if it is already absolutely closed, i.e. if and only if it is a special amalgamation base.
Comments: 29 pages, LaTeX with ajour.cls package
Amalgams of nilpotent groups of class two
Geometric structure of class two nilpotent groups and subgroup growth
A correction to a result of B. Maier
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